Jayadev S. Athreya scite author profile

We prove analogs of the logarithm laws of Sullivan and Kleinbock-Margulis in the context of unipotent flows. In particular, we obtain results for one-parameter actions on the space of lattices SL(n,R)/ SL(n,Z). The key lemma for our results says the measure of the set of unimodular lattices in R n that does not intersect a 'large' volume subset of R n is 'small'. This can be considered as a 'random' analog of the classical Minkowski Theorem in the geometry of numbers.

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Quantitative Recurrence and Large Deviations for Teichmuller Geodesic Flow

Athreya

2006

Geom Dedicata

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Lattice point asymptotics and volume growth on Teichmüller space

Athreya¹,

Bufetov²,

Eskin³

et al. 2012

Duke Math. J.

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We apply some of the ideas of the Ph.D. Thesis of G. A. Margulis [Mar70] to Teichmüller space. Let X be a point in Teichmüller space, and let BR(X) be the ball of radius R centered at X (with distances measured in the Teichmüller metric). We obtain asymptotic formulas as R tends to infinity for the volume of BR(X), and also for the cardinality of the intersection of BR(X) with an orbit of the mapping class group.

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A Poincaré Section for the Horocycle Flow on the Space of Lattices

Athreya

Cheung

2013

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Abstract. We construct a Poincaré section for the horocycle flow on the modular surface SL(2, R)/SL(2, Z), and study the associated first return map, which coincides with a transformation (the BCZ map) defined by Boca-Cobeli-Zaharescu [8]. We classify ergodic invariant measures for this map and prove equidistribution of periodic orbits. As corollaries, we obtain results on the average depth of cusp excursions and on the distribution of gaps for Farey sequences and slopes of lattice vectors.

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Logarithm laws and shrinking target properties

Athreya

2009

Proc Math Sci

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